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      "source": [
        "## Meta-Learning with the Rank-Weighted GP Ensemble (RGPE)\n",
        "\n",
        "BoTorch is designed in to be model-agnostic and only requries that a model conform to a minimal interface. This tutorial walks through an example of implementing the rank-weighted Gaussian process ensemble (RGPE) [Feurer, Letham, Bakshy ICML 2018 AutoML Workshop] and using the RGPE in BoTorch to do meta-learning across related optimization tasks.\n",
        "\n",
        "* Original paper: https://arxiv.org/pdf/1802.02219.pdf"
      ]
    },
    {
      "cell_type": "code",
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      "source": [
        "# Install dependencies if we are running in colab\n",
        "import sys\n",
        "if 'google.colab' in sys.modules:\n",
        "    %pip install botorch"
      ]
    },
    {
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      "source": [
        "import os\n",
        "import torch\n",
        "import math\n",
        "\n",
        "\n",
        "torch.manual_seed(29)\n",
        "device = torch.device(\"cuda\" if torch.cuda.is_available() else \"cpu\")\n",
        "dtype = torch.double\n",
        "SMOKE_TEST = os.environ.get(\"SMOKE_TEST\")"
      ]
    },
    {
      "cell_type": "markdown",
      "metadata": {
        "language": "markdown",
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      },
      "source": [
        "### Toy Problem\n",
        "* We consider optimizing the following 1-D synthetic function\n",
        "$$f(x, s_i) = \\frac{1}{10}\\bigg(x-1\\bigg)\\bigg(\\sin(x+s_i)+\\frac{1}{10}\\bigg)$$\n",
        "where\n",
        "$$s_i = \\frac{(i+9)\\pi}{8}$$\n",
        "is a task-dependent shift parameter and $i$ is the task index $i \\in [1, t]$.\n",
        "\n",
        "* In this tutorial, we will consider the scenario where we have collected data from 5 prior tasks (referred to as base tasks), which with a different task dependent shift parameter $s_i$.\n",
        "\n",
        "* The goal now is use meta-learning to improve sample efficiency when optimizing a 6th task."
      ]
    },
    {
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      },
      "source": [
        "#### Toy Problem Setup\n",
        "\n",
        "First let's define a function for compute the shift parameter $s_i$ and set the shift amount for the target task."
      ]
    },
    {
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      "execution_count": 2,
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      "source": [
        "NUM_BASE_TASKS = 5 if not SMOKE_TEST else 2\n",
        "\n",
        "\n",
        "def task_shift(task):\n",
        "    \"\"\"\n",
        "    Fetch shift amount for task.\n",
        "    \"\"\"\n",
        "    return math.pi * task / 12.0\n",
        "\n",
        "\n",
        "# set shift for target task\n",
        "\n",
        "TARGET_SHIFT = 0.0"
      ]
    },
    {
      "cell_type": "markdown",
      "metadata": {
        "language": "markdown",
        "originalKey": "d5650131-21e8-40d4-9003-d89b7431fb29",
        "outputsInitialized": false,
        "showInput": false
      },
      "source": [
        "Then, let's define our function $f(x, s_i)$ and set bounds on $x$."
      ]
    },
    {
      "cell_type": "code",
      "execution_count": 3,
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      "source": [
        "BOUNDS = torch.tensor([[-10.0], [10.0]], dtype=dtype, device=device)\n",
        "\n",
        "\n",
        "def f(X, shift=TARGET_SHIFT):\n",
        "    \"\"\"\n",
        "    Torch-compatible objective function for the target_task\n",
        "    \"\"\"\n",
        "    f_X = X * torch.sin(X + math.pi + shift) + X / 10.0\n",
        "    return f_X"
      ]
    },
    {
      "cell_type": "markdown",
      "metadata": {
        "language": "markdown",
        "originalKey": "d9896be8-4cd9-487e-9832-768e533635c4",
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      },
      "source": [
        "#### Sample training data for prior base tasks"
      ]
    },
    {
      "cell_type": "markdown",
      "metadata": {
        "language": "markdown",
        "originalKey": "f27bbe94-c3cb-4d58-9d82-ebd60d4ebd59",
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      },
      "source": [
        "We sample data from a Sobol sequence to help ensure numerical stability when using a small amount of 1-D data. Sobol sequences help prevent us from sampling a bunch of training points that are close together."
      ]
    },
    {
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      "execution_count": 4,
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      "source": [
        "from botorch.utils.sampling import draw_sobol_samples\n",
        "from botorch.utils.transforms import normalize, unnormalize\n",
        "\n",
        "\n",
        "noise_std = 0.05\n",
        "\n",
        "# Sample data for each base task\n",
        "data_by_task = {}\n",
        "for task in range(NUM_BASE_TASKS):\n",
        "    num_training_points = 20\n",
        "    # draw points from a sobol sequence\n",
        "    raw_x = draw_sobol_samples(\n",
        "        bounds=BOUNDS,\n",
        "        n=num_training_points,\n",
        "        q=1,\n",
        "        seed=task + 5397923,\n",
        "    ).squeeze(1)\n",
        "    # get observed values\n",
        "    f_x = f(raw_x, task_shift(task + 1))\n",
        "    train_y = f_x + noise_std * torch.randn_like(f_x)\n",
        "    train_yvar = torch.full_like(train_y, noise_std**2)\n",
        "    # store training data\n",
        "    data_by_task[task] = {\n",
        "        # scale x to [0, 1]\n",
        "        \"train_x\": normalize(raw_x, bounds=BOUNDS),\n",
        "        \"train_y\": train_y,\n",
        "        \"train_yvar\": train_yvar,\n",
        "    }"
      ]
    },
    {
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        "originalKey": "80336086-3253-4a0a-8875-e5db7440b362",
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        "showInput": false
      },
      "source": [
        "#### Let's plot the base tasks and the target task function along with the observed points"
      ]
    },
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",
            "text/plain": [
              "<Figure size 1200x800 with 1 Axes>"
            ]
          },
          "metadata": {},
          "output_type": "display_data"
        }
      ],
      "source": [
        "from matplotlib import pyplot as plt\n",
        "\n",
        "%matplotlib inline\n",
        "\n",
        "\n",
        "fig, ax = plt.subplots(1, 1, figsize=(12, 8))\n",
        "x = torch.linspace(-10, 10, 51)\n",
        "for task in data_by_task:\n",
        "    # plot true function and observed values for base runs\n",
        "    t = ax.plot(\n",
        "        unnormalize(data_by_task[task][\"train_x\"], bounds=BOUNDS).cpu().numpy(),\n",
        "        data_by_task[task][\"train_y\"].cpu().numpy(),\n",
        "        \".\",\n",
        "        markersize=10,\n",
        "        label=f\"Observed task {task}\",\n",
        "    )\n",
        "    ax.plot(\n",
        "        x.detach().numpy(),\n",
        "        f(x, task_shift(task + 1)).cpu().numpy(),\n",
        "        label=f\"Base task {task}\",\n",
        "        color=t[0].get_color(),\n",
        "    )\n",
        "# plot true target function\n",
        "ax.plot(\n",
        "    x.detach().numpy(),\n",
        "    f(x, TARGET_SHIFT).detach().numpy(),\n",
        "    \"--\",\n",
        "    label=\"Target task\",\n",
        ")\n",
        "ax.legend(loc=\"lower right\", fontsize=10)\n",
        "plt.tight_layout()"
      ]
    },
    {
      "cell_type": "markdown",
      "metadata": {
        "language": "markdown",
        "originalKey": "25d7a014-8982-40e0-8025-f12bba83dc45",
        "outputsInitialized": false,
        "showInput": false
      },
      "source": [
        "### Fit base task models"
      ]
    },
    {
      "cell_type": "markdown",
      "metadata": {
        "language": "markdown",
        "originalKey": "cdf621a8-1057-4cf3-a129-668abb1f9453",
        "outputsInitialized": false,
        "showInput": false
      },
      "source": [
        "First, let's define a helper function to fit a SingleTaskGP with an fixed observed noise level."
      ]
    },
    {
      "cell_type": "code",
      "execution_count": 6,
      "metadata": {
        "collapsed": false,
        "customOutput": null,
        "executionStartTime": 1724948316352,
        "executionStopTime": 1724948316501,
        "jupyter": {
          "outputs_hidden": false
        },
        "language": "python",
        "originalKey": "5474e712-cefa-4a7d-b673-af10fcf83239",
        "outputsInitialized": true,
        "requestMsgId": "5474e712-cefa-4a7d-b673-af10fcf83239",
        "serverExecutionDuration": 2.9860010836273
      },
      "outputs": [],
      "source": [
        "from gpytorch.mlls import ExactMarginalLogLikelihood\n",
        "from botorch.models import SingleTaskGP\n",
        "from botorch.fit import fit_gpytorch_mll\n",
        "\n",
        "\n",
        "def get_fitted_model(train_X, train_Y, train_Yvar, state_dict=None):\n",
        "    \"\"\"\n",
        "    Get a single task GP. The model will be fit unless a state_dict with model\n",
        "        hyperparameters is provided.\n",
        "    \"\"\"\n",
        "    model = SingleTaskGP(train_X=train_X, train_Y=train_Y, train_Yvar=train_Yvar)\n",
        "    if state_dict is None:\n",
        "        mll = ExactMarginalLogLikelihood(model.likelihood, model).to(train_X)\n",
        "        fit_gpytorch_mll(mll)\n",
        "    else:\n",
        "        model.load_state_dict(state_dict)\n",
        "    return model"
      ]
    },
    {
      "cell_type": "markdown",
      "metadata": {
        "language": "markdown",
        "originalKey": "fe570963-41f1-47a5-8e53-5cf08e6390ba",
        "outputsInitialized": false,
        "showInput": false
      },
      "source": [
        "#### Now let's fit a SingleTaskGP for each base task"
      ]
    },
    {
      "cell_type": "code",
      "execution_count": 7,
      "metadata": {
        "collapsed": false,
        "customOutput": null,
        "executionStartTime": 1724948317183,
        "executionStopTime": 1724948318815,
        "jupyter": {
          "outputs_hidden": false
        },
        "language": "python",
        "originalKey": "a7bd3664-5585-47e9-9743-2ee53d7a259f",
        "outputsInitialized": true,
        "requestMsgId": "a7bd3664-5585-47e9-9743-2ee53d7a259f",
        "serverExecutionDuration": 1460.1275878958
      },
      "outputs": [
        {
          "name": "stdout",
          "output_type": "stream",
          "text": [
            "Fitting base model 0\n",
            "Fitting base model 1\n",
            "Fitting base model 2\n",
            "Fitting base model 3\n",
            "Fitting base model 4\n"
          ]
        }
      ],
      "source": [
        "# Fit base model\n",
        "base_model_list = []\n",
        "for task in range(NUM_BASE_TASKS):\n",
        "    print(f\"Fitting base model {task}\")\n",
        "    model = get_fitted_model(\n",
        "        data_by_task[task][\"train_x\"],\n",
        "        data_by_task[task][\"train_y\"],\n",
        "        data_by_task[task][\"train_yvar\"],\n",
        "    )\n",
        "    base_model_list.append(model)"
      ]
    },
    {
      "cell_type": "markdown",
      "metadata": {
        "language": "markdown",
        "originalKey": "6ea07cc4-db47-4d01-9840-220e9615b6a3",
        "outputsInitialized": false,
        "showInput": false
      },
      "source": [
        "### Implement the RGPE\n",
        "\n",
        "The main idea of the RGPE is to estimate the target function as weighted sum of the target model and the base models:\n",
        "$$\\bar f(\\mathbf x | \\mathcal D) =\n",
        "\\sum_{i=1}^{t} w_if^i(\\mathbf x |\\mathcal D_i)$$\n",
        "Importantly, the ensemble model is also a GP:\n",
        "$$\\bar f(\\mathbf x | \\mathcal D) \\sim \\mathcal N\\bigg(\\sum_{i=1}^{t} w_i\\mu_i(\\mathbf x), \\sum_{i=1}^{t}w_i^2\\sigma_i^2\\bigg)$$\n",
        "\n",
        "The weights $w_i$ for model $i$ are based on the the ranking loss between a draw from the model's posterior and the targets. Specifically, the ranking loss for model $i$ is:\n",
        "$$\\mathcal L(f^i, \\mathcal D_t) = \\sum_{j=1}^{n_t}\\sum_{k=1}^{n_t}\\mathbb 1\\bigg[\\bigg(f^i\\big(\\mathbf x^t_j\\big) < f^i\\big(\\mathbf x_k^t\\big)\\bigg)\\oplus \\big(y_j^t < y_k^t\\big)\\bigg]$$\n",
        "where $\\oplus$ is exclusive-or.\n",
        "\n",
        "The loss for the target model is computing using leave-one-out cross-validation (LOOCV) and is given by:\n",
        "$$\\mathcal L(f^t, \\mathcal D_t) = \\sum_{j=1}^{n_t}\\sum_{k=1}^{n_t}\\mathbb 1\\bigg[\\bigg(f^t_{-j}\\big(\\mathbf x^t_j\\big) < f^t_{-j}\\big(\\mathbf x_k^t\\big)\\bigg)\\oplus \\big(y_j^t < y_k^t\\big)\\bigg]$$\n",
        "where $f^t_{-j}$ model fitted to all data from the target task except training example $j$.\n",
        "\n",
        "The weights are then computed as:\n",
        "$$w_i = \\frac{1}{S}\\sum_{s=1}^S\\mathbb 1\\big(i = \\text{argmin}_{i'}l_{i', s}\\big)$$"
      ]
    },
    {
      "cell_type": "code",
      "execution_count": 8,
      "metadata": {
        "collapsed": false,
        "customOutput": null,
        "executionStartTime": 1724948320494,
        "executionStopTime": 1724948320631,
        "jupyter": {
          "outputs_hidden": false
        },
        "language": "python",
        "originalKey": "58ed8284-8181-459c-9025-42532793929f",
        "outputsInitialized": true,
        "requestMsgId": "58ed8284-8181-459c-9025-42532793929f",
        "serverExecutionDuration": 2.3661230225116
      },
      "outputs": [],
      "source": [
        "def roll_col(X, shift):\n",
        "    \"\"\"\n",
        "    Rotate columns to right by shift.\n",
        "    \"\"\"\n",
        "    return torch.cat((X[..., -shift:], X[..., :-shift]), dim=-1)"
      ]
    },
    {
      "cell_type": "code",
      "execution_count": 9,
      "metadata": {
        "collapsed": false,
        "customOutput": null,
        "executionStartTime": 1724948325542,
        "executionStopTime": 1724948325683,
        "jupyter": {
          "outputs_hidden": false
        },
        "language": "python",
        "originalKey": "bde867e5-67e9-47f0-bae3-20112bebd51d",
        "outputsInitialized": true,
        "requestMsgId": "bde867e5-67e9-47f0-bae3-20112bebd51d",
        "serverExecutionDuration": 3.575277980417
      },
      "outputs": [],
      "source": [
        "def compute_ranking_loss(f_samps, target_y):\n",
        "    \"\"\"\n",
        "    Compute ranking loss for each sample from the posterior over target points.\n",
        "\n",
        "    Args:\n",
        "        f_samps: `n_samples x (n) x n`-dim tensor of samples\n",
        "        target_y: `n x 1`-dim tensor of targets\n",
        "    Returns:\n",
        "        Tensor: `n_samples`-dim tensor containing the ranking loss across each sample\n",
        "    \"\"\"\n",
        "    n = target_y.shape[0]\n",
        "    if f_samps.ndim == 3:\n",
        "        # Compute ranking loss for target model\n",
        "        # take cartesian product of target_y\n",
        "        cartesian_y = torch.cartesian_prod(\n",
        "            target_y.squeeze(-1),\n",
        "            target_y.squeeze(-1),\n",
        "        ).view(n, n, 2)\n",
        "        # the diagonal of f_samps are the out-of-sample predictions\n",
        "        # for each LOO model, compare the out of sample predictions to each in-sample prediction\n",
        "        rank_loss = (\n",
        "            (\n",
        "                (f_samps.diagonal(dim1=1, dim2=2).unsqueeze(-1) < f_samps)\n",
        "                ^ (cartesian_y[..., 0] < cartesian_y[..., 1])\n",
        "            )\n",
        "            .sum(dim=-1)\n",
        "            .sum(dim=-1)\n",
        "        )\n",
        "    else:\n",
        "        rank_loss = torch.zeros(\n",
        "            f_samps.shape[0], dtype=torch.long, device=target_y.device\n",
        "        )\n",
        "        y_stack = target_y.squeeze(-1).expand(f_samps.shape)\n",
        "        for i in range(1, target_y.shape[0]):\n",
        "            rank_loss += (\n",
        "                (roll_col(f_samps, i) < f_samps) ^ (roll_col(y_stack, i) < y_stack)\n",
        "            ).sum(dim=-1)\n",
        "    return rank_loss"
      ]
    },
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      "source": [
        "Define a function to:\n",
        "1. Create a batch mode-gp LOOCV GP using the hyperparameters from `target_model`\n",
        "2. Draw a joint sample across all points from the target task (in-sample and out-of-sample)"
      ]
    },
    {
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      "source": [
        "# State dict that are not parameters should not be expanded,\n",
        "# as these are not expanded on the model by default.\n",
        "NON_EXPAND_ATTRIBUTES = [\n",
        "    \"covar_module.lengthscale_prior._transformed_loc\",\n",
        "    \"covar_module.lengthscale_prior._transformed_scale\",\n",
        "    \"covar_module.raw_lengthscale_constraint.lower_bound\",\n",
        "    \"covar_module.raw_lengthscale_constraint.upper_bound\",\n",
        "    \"outcome_transform._is_trained\",\n",
        "]\n",
        "\n",
        "def get_target_model_loocv_sample_preds(\n",
        "    train_x, train_y, train_yvar, target_model, num_samples\n",
        "):\n",
        "    \"\"\"\n",
        "    Create a batch-mode LOOCV GP and draw a joint sample across all points from the target task.\n",
        "\n",
        "    Args:\n",
        "        train_x: `n x d` tensor of training points\n",
        "        train_y: `n x 1` tensor of training targets\n",
        "        target_model: fitted target model\n",
        "        num_samples: number of mc samples to draw\n",
        "\n",
        "    Return: `num_samples x n x n`-dim tensor of samples, where dim=1 represents the `n` LOO models,\n",
        "        and dim=2 represents the `n` training points.\n",
        "    \"\"\"\n",
        "    batch_size = len(train_x)\n",
        "    masks = torch.eye(len(train_x), dtype=torch.uint8, device=device).bool()\n",
        "    train_x_cv = torch.stack([train_x[~m] for m in masks])\n",
        "    train_y_cv = torch.stack([train_y[~m] for m in masks])\n",
        "    train_yvar_cv = torch.stack([train_yvar[~m] for m in masks])\n",
        "    state_dict = target_model.state_dict()\n",
        "    # expand to batch size of batch_mode LOOCV model\n",
        "    state_dict_expanded = {\n",
        "        name: (\n",
        "            t.expand(batch_size, *[-1 for _ in range(t.ndim)])\n",
        "            if name not in NON_EXPAND_ATTRIBUTES\n",
        "            else t\n",
        "        )\n",
        "        for name, t in state_dict.items()\n",
        "    }\n",
        "    model = get_fitted_model(\n",
        "        train_x_cv, train_y_cv, train_yvar_cv, state_dict=state_dict_expanded\n",
        "    )\n",
        "    with torch.no_grad():\n",
        "        posterior = model.posterior(train_x)\n",
        "        # Since we have a batch mode gp and model.posterior always returns an output dimension,\n",
        "        # the output from `posterior.sample()` here `num_samples x n x n x 1`, so let's squeeze\n",
        "        # the last dimension.\n",
        "        sampler = SobolQMCNormalSampler(sample_shape=torch.Size([num_samples]))\n",
        "        return sampler(posterior).squeeze(-1)"
      ]
    },
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      "source": [
        "def compute_rank_weights(train_x, train_y, base_models, target_model, num_samples):\n",
        "    \"\"\"\n",
        "    Compute ranking weights for each base model and the target model (using\n",
        "        LOOCV for the target model). Note: This implementation does not currently\n",
        "        address weight dilution, since we only have a small number of base models.\n",
        "\n",
        "    Args:\n",
        "        train_x: `n x d` tensor of training points (for target task)\n",
        "        train_y: `n` tensor of training targets (for target task)\n",
        "        base_models: list of base models\n",
        "        target_model: target model\n",
        "        num_samples: number of mc samples\n",
        "\n",
        "    Returns:\n",
        "        Tensor: `n_t`-dim tensor with the ranking weight for each model\n",
        "    \"\"\"\n",
        "    ranking_losses = []\n",
        "    # compute ranking loss for each base model\n",
        "    for task in range(len(base_models)):\n",
        "        model = base_models[task]\n",
        "        # compute posterior over training points for target task\n",
        "        posterior = model.posterior(train_x)\n",
        "        sampler = SobolQMCNormalSampler(sample_shape=torch.Size([num_samples]))\n",
        "        base_f_samps = sampler(posterior).squeeze(-1).squeeze(-1)\n",
        "        # compute and save ranking loss\n",
        "        ranking_losses.append(compute_ranking_loss(base_f_samps, train_y))\n",
        "    # compute ranking loss for target model using LOOCV\n",
        "    # f_samps\n",
        "    target_f_samps = get_target_model_loocv_sample_preds(\n",
        "        train_x,\n",
        "        train_y,\n",
        "        train_yvar,\n",
        "        target_model,\n",
        "        num_samples,\n",
        "    )\n",
        "    ranking_losses.append(compute_ranking_loss(target_f_samps, train_y))\n",
        "    ranking_loss_tensor = torch.stack(ranking_losses)\n",
        "    # compute best model (minimum ranking loss) for each sample\n",
        "    best_models = torch.argmin(ranking_loss_tensor, dim=0)\n",
        "    # compute proportion of samples for which each model is best\n",
        "    rank_weights = (\n",
        "        best_models.bincount(minlength=len(ranking_losses)).type_as(train_x)\n",
        "        / num_samples\n",
        "    )\n",
        "    return rank_weights"
      ]
    },
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      "source": [
        "from botorch.models.gpytorch import GPyTorchModel\n",
        "from gpytorch.models import GP\n",
        "from gpytorch.distributions import MultivariateNormal\n",
        "from gpytorch.likelihoods import LikelihoodList\n",
        "from linear_operator.operators import PsdSumLinearOperator\n",
        "from torch.nn import ModuleList\n",
        "\n",
        "\n",
        "class RGPE(GP, GPyTorchModel):\n",
        "    \"\"\"\n",
        "    Rank-weighted GP ensemble. Note: this class inherits from GPyTorchModel which provides an\n",
        "        interface for GPyTorch models in botorch.\n",
        "    \"\"\"\n",
        "\n",
        "    _num_outputs = 1  # metadata for botorch\n",
        "\n",
        "    def __init__(self, models, weights):\n",
        "        super().__init__()\n",
        "        self.models = ModuleList(models)\n",
        "        for m in models:\n",
        "            if not hasattr(m, \"likelihood\"):\n",
        "                raise ValueError(\n",
        "                    \"RGPE currently only supports models that have a likelihood (e.g. ExactGPs)\"\n",
        "                )\n",
        "        self.likelihood = LikelihoodList(*[m.likelihood for m in models])\n",
        "        self.weights = weights\n",
        "        self.to(weights)\n",
        "\n",
        "    def forward(self, x):\n",
        "        weighted_means = []\n",
        "        weighted_covars = []\n",
        "        # filter model with zero weights\n",
        "        # weights on covariance matrices are weight**2\n",
        "        non_zero_weight_indices = (self.weights**2 > 0).nonzero()\n",
        "        non_zero_weights = self.weights[non_zero_weight_indices]\n",
        "        # re-normalize\n",
        "        non_zero_weights /= non_zero_weights.sum()\n",
        "\n",
        "        for non_zero_weight_idx in range(non_zero_weight_indices.shape[0]):\n",
        "            raw_idx = non_zero_weight_indices[non_zero_weight_idx].item()\n",
        "            model = self.models[raw_idx]\n",
        "            posterior = model.posterior(x)\n",
        "            # unstandardize predictions\n",
        "            posterior_mean = posterior.mean.squeeze(-1)\n",
        "            posterior_cov = posterior.mvn.lazy_covariance_matrix\n",
        "            # apply weight\n",
        "            weight = non_zero_weights[non_zero_weight_idx]\n",
        "            weighted_means.append(weight * posterior_mean)\n",
        "            weighted_covars.append(posterior_cov * weight**2)\n",
        "        # set mean and covariance to be the rank-weighted sum the means and covariances of the\n",
        "        # base models and target model\n",
        "        mean_x = torch.stack(weighted_means).sum(dim=0)\n",
        "        covar_x = PsdSumLinearOperator(*weighted_covars)\n",
        "        return MultivariateNormal(mean_x, covar_x)"
      ]
    },
    {
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        "showInput": false
      },
      "source": [
        "### Optimize target function using RGPE + qNEI"
      ]
    },
    {
      "cell_type": "code",
      "execution_count": 13,
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      "outputs": [
        {
          "name": "stdout",
          "output_type": "stream",
          "text": [
            "Trial 1 of 10\n",
            "Trial 2 of 10\n",
            "Trial 3 of 10\n",
            "Trial 4 of 10\n",
            "Trial 5 of 10\n",
            "Trial 6 of 10\n"
          ]
        },
        {
          "name": "stderr",
          "output_type": "stream",
          "text": [
            "/Users/saitcakmak/botorch/botorch/optim/optimize.py:648: RuntimeWarning: Optimization failed in `gen_candidates_scipy` with the following warning(s):\n",
            "[OptimizationWarning('Optimization failed within `scipy.optimize.minimize` with status 2 and message ABNORMAL_TERMINATION_IN_LNSRCH.')]\n",
            "Trying again with a new set of initial conditions.\n",
            "  return _optimize_acqf_batch(opt_inputs=opt_inputs)\n",
            "/Users/saitcakmak/botorch/botorch/optim/optimize.py:648: RuntimeWarning: Optimization failed on the second try, after generating a new set of initial conditions.\n",
            "  return _optimize_acqf_batch(opt_inputs=opt_inputs)\n",
            "/Users/saitcakmak/botorch/botorch/optim/optimize.py:648: RuntimeWarning: Optimization failed in `gen_candidates_scipy` with the following warning(s):\n",
            "[BotorchWarning('Low-rank cholesky updates failed due NaNs or due to an ill-conditioned covariance matrix. Falling back to standard sampling.'), OptimizationWarning('Optimization failed within `scipy.optimize.minimize` with status 2 and message ABNORMAL_TERMINATION_IN_LNSRCH.'), BotorchWarning('Low-rank cholesky updates failed due NaNs or due to an ill-conditioned covariance matrix. Falling back to standard sampling.')]\n",
            "Trying again with a new set of initial conditions.\n",
            "  return _optimize_acqf_batch(opt_inputs=opt_inputs)\n"
          ]
        },
        {
          "name": "stdout",
          "output_type": "stream",
          "text": [
            "Trial 7 of 10\n"
          ]
        },
        {
          "name": "stderr",
          "output_type": "stream",
          "text": [
            "/Users/saitcakmak/botorch/botorch/optim/optimize.py:648: RuntimeWarning: Optimization failed in `gen_candidates_scipy` with the following warning(s):\n",
            "[OptimizationWarning('Optimization failed within `scipy.optimize.minimize` with status 2 and message ABNORMAL_TERMINATION_IN_LNSRCH.')]\n",
            "Trying again with a new set of initial conditions.\n",
            "  return _optimize_acqf_batch(opt_inputs=opt_inputs)\n",
            "/Users/saitcakmak/botorch/botorch/optim/optimize.py:648: RuntimeWarning: Optimization failed on the second try, after generating a new set of initial conditions.\n",
            "  return _optimize_acqf_batch(opt_inputs=opt_inputs)\n"
          ]
        },
        {
          "name": "stdout",
          "output_type": "stream",
          "text": [
            "Trial 8 of 10\n"
          ]
        },
        {
          "name": "stderr",
          "output_type": "stream",
          "text": [
            "/Users/saitcakmak/botorch/botorch/optim/optimize.py:648: RuntimeWarning: Optimization failed in `gen_candidates_scipy` with the following warning(s):\n",
            "[OptimizationWarning('Optimization failed within `scipy.optimize.minimize` with status 2 and message ABNORMAL_TERMINATION_IN_LNSRCH.')]\n",
            "Trying again with a new set of initial conditions.\n",
            "  return _optimize_acqf_batch(opt_inputs=opt_inputs)\n",
            "/Users/saitcakmak/botorch/botorch/optim/optimize.py:648: RuntimeWarning: Optimization failed on the second try, after generating a new set of initial conditions.\n",
            "  return _optimize_acqf_batch(opt_inputs=opt_inputs)\n"
          ]
        },
        {
          "name": "stdout",
          "output_type": "stream",
          "text": [
            "Trial 9 of 10\n",
            "Trial 10 of 10\n"
          ]
        },
        {
          "name": "stdout",
          "output_type": "stream",
          "text": [
            "Trial 8 of 10\n"
          ]
        },
        {
          "name": "stdout",
          "output_type": "stream",
          "text": [
            "Trial 9 of 10\n"
          ]
        },
        {
          "name": "stderr",
          "output_type": "stream",
          "text": [
            "[W 240829 09:21:46 optimize:564] Optimization failed in `gen_candidates_scipy` with the following warning(s):\n",
            "    [OptimizationWarning('Optimization failed within `scipy.optimize.minimize` with status 2 and message ABNORMAL_TERMINATION_IN_LNSRCH.')]\n",
            "    Trying again with a new set of initial conditions.\n"
          ]
        },
        {
          "name": "stderr",
          "output_type": "stream",
          "text": [
            "[W 240829 09:21:46 optimize:564] Optimization failed on the second try, after generating a new set of initial conditions.\n"
          ]
        },
        {
          "name": "stdout",
          "output_type": "stream",
          "text": [
            "Trial 10 of 10\n"
          ]
        }
      ],
      "source": [
        "# suppress GPyTorch warnings about adding jitter\n",
        "import warnings\n",
        "\n",
        "from botorch.acquisition.logei import qLogNoisyExpectedImprovement\n",
        "from botorch.optim.optimize import optimize_acqf\n",
        "from botorch.sampling.normal import SobolQMCNormalSampler\n",
        "\n",
        "\n",
        "warnings.filterwarnings(\"ignore\", \"^.*jitter.*\", category=RuntimeWarning)\n",
        "\n",
        "\n",
        "best_rgpe_all = []\n",
        "best_random_all = []\n",
        "best_vanilla_nei_all = []\n",
        "N_BATCH = 10 if not SMOKE_TEST else 2\n",
        "NUM_POSTERIOR_SAMPLES = 256 if not SMOKE_TEST else 16\n",
        "RANDOM_INITIALIZATION_SIZE = 3\n",
        "N_TRIALS = 10 if not SMOKE_TEST else 2\n",
        "MC_SAMPLES = 512 if not SMOKE_TEST else 32\n",
        "N_RESTART_CANDIDATES = 512 if not SMOKE_TEST else 8\n",
        "N_RESTARTS = 10 if not SMOKE_TEST else 2\n",
        "Q_BATCH_SIZE = 1\n",
        "\n",
        "\n",
        "# Average over multiple trials\n",
        "for trial in range(N_TRIALS):\n",
        "    print(f\"Trial {trial + 1} of {N_TRIALS}\")\n",
        "    best_rgpe = []\n",
        "    best_random = []\n",
        "    best_vanilla_nei = []\n",
        "    # Initial random observations\n",
        "    raw_x = draw_sobol_samples(\n",
        "        bounds=BOUNDS, n=RANDOM_INITIALIZATION_SIZE, q=1, seed=trial\n",
        "    ).squeeze(1)\n",
        "    train_x = normalize(raw_x, bounds=BOUNDS)\n",
        "    train_y_noiseless = f(raw_x)\n",
        "    train_y = train_y_noiseless + noise_std * torch.randn_like(train_y_noiseless)\n",
        "    train_yvar = torch.full_like(train_y, noise_std**2)\n",
        "    vanilla_nei_train_x = train_x.clone()\n",
        "    vanilla_nei_train_y = train_y.clone()\n",
        "    vanilla_nei_train_yvar = train_yvar.clone()\n",
        "    # keep track of the best observed point at each iteration\n",
        "    best_value = train_y.max().item()\n",
        "    best_rgpe.append(best_value)\n",
        "    best_random.append(best_value)\n",
        "    vanilla_nei_best_value = best_value\n",
        "    best_vanilla_nei.append(vanilla_nei_best_value)\n",
        "\n",
        "    # Run N_BATCH rounds of BayesOpt after the initial random batch\n",
        "    for iteration in range(N_BATCH):\n",
        "        target_model = get_fitted_model(train_x, train_y, train_yvar)\n",
        "        model_list = base_model_list + [target_model]\n",
        "        rank_weights = compute_rank_weights(\n",
        "            train_x,\n",
        "            train_y,\n",
        "            base_model_list,\n",
        "            target_model,\n",
        "            NUM_POSTERIOR_SAMPLES,\n",
        "        )\n",
        "\n",
        "        # create model and acquisition function\n",
        "        rgpe_model = RGPE(model_list, rank_weights)\n",
        "        sampler_qnei = SobolQMCNormalSampler(sample_shape=torch.Size([MC_SAMPLES]))\n",
        "        qNEI = qLogNoisyExpectedImprovement(\n",
        "            model=rgpe_model,\n",
        "            X_baseline=train_x,\n",
        "            sampler=sampler_qnei,\n",
        "            prune_baseline=False,\n",
        "        )\n",
        "\n",
        "        # optimize\n",
        "        candidate, _ = optimize_acqf(\n",
        "            acq_function=qNEI,\n",
        "            bounds=torch.tensor([[0.0], [1.0]], dtype=dtype, device=device),\n",
        "            q=Q_BATCH_SIZE,\n",
        "            num_restarts=N_RESTARTS,\n",
        "            raw_samples=N_RESTART_CANDIDATES,\n",
        "        )\n",
        "\n",
        "        # fetch the new values\n",
        "        new_x = candidate.detach()\n",
        "        new_y_noiseless = f(unnormalize(new_x, bounds=BOUNDS))\n",
        "        new_y = new_y_noiseless + noise_std * torch.randn_like(new_y_noiseless)\n",
        "        new_yvar = torch.full_like(new_y, noise_std**2)\n",
        "\n",
        "        # update training points\n",
        "        train_x = torch.cat((train_x, new_x))\n",
        "        train_y = torch.cat((train_y, new_y))\n",
        "        train_yvar = torch.cat((train_yvar, new_yvar))\n",
        "        random_candidate = torch.rand(1, dtype=dtype, device=device)\n",
        "        next_random_noiseless = f(unnormalize(random_candidate, bounds=BOUNDS))\n",
        "        next_random = next_random_noiseless + noise_std * torch.randn_like(\n",
        "            next_random_noiseless\n",
        "        )\n",
        "        next_random_best = next_random.max().item()\n",
        "        best_random.append(max(best_random[-1], next_random_best))\n",
        "\n",
        "        # get the new best observed value\n",
        "        best_value = train_y.max().item()\n",
        "        best_rgpe.append(best_value)\n",
        "\n",
        "        # Run Vanilla NEI for comparison\n",
        "        vanilla_nei_model = get_fitted_model(\n",
        "            vanilla_nei_train_x,\n",
        "            vanilla_nei_train_y,\n",
        "            vanilla_nei_train_yvar,\n",
        "        )\n",
        "        vanilla_nei_sampler = SobolQMCNormalSampler(\n",
        "            sample_shape=torch.Size([MC_SAMPLES])\n",
        "        )\n",
        "        vanilla_qNEI = qLogNoisyExpectedImprovement(\n",
        "            model=vanilla_nei_model,\n",
        "            X_baseline=vanilla_nei_train_x,\n",
        "            sampler=vanilla_nei_sampler,\n",
        "        )\n",
        "        vanilla_nei_candidate, _ = optimize_acqf(\n",
        "            acq_function=vanilla_qNEI,\n",
        "            bounds=torch.tensor([[0.0], [1.0]], dtype=dtype, device=device),\n",
        "            q=Q_BATCH_SIZE,\n",
        "            num_restarts=N_RESTARTS,\n",
        "            raw_samples=N_RESTART_CANDIDATES,\n",
        "        )\n",
        "        # fetch the new values\n",
        "        vanilla_nei_new_x = vanilla_nei_candidate.detach()\n",
        "        vanilla_nei_new_y_noiseless = f(unnormalize(vanilla_nei_new_x, bounds=BOUNDS))\n",
        "        vanilla_nei_new_y = vanilla_nei_new_y_noiseless + noise_std * torch.randn_like(\n",
        "            new_y_noiseless\n",
        "        )\n",
        "        vanilla_nei_new_yvar = torch.full_like(vanilla_nei_new_y, noise_std**2)\n",
        "\n",
        "        # update training points\n",
        "        vanilla_nei_train_x = torch.cat([vanilla_nei_train_x, vanilla_nei_new_x])\n",
        "        vanilla_nei_train_y = torch.cat([vanilla_nei_train_y, vanilla_nei_new_y])\n",
        "        vanilla_nei_train_yvar = torch.cat(\n",
        "            [vanilla_nei_train_yvar, vanilla_nei_new_yvar]\n",
        "        )\n",
        "\n",
        "        # get the new best observed value\n",
        "        vanilla_nei_best_value = vanilla_nei_train_y.max().item()\n",
        "        best_vanilla_nei.append(vanilla_nei_best_value)\n",
        "\n",
        "    best_rgpe_all.append(best_rgpe)\n",
        "    best_random_all.append(best_random)\n",
        "    best_vanilla_nei_all.append(best_vanilla_nei)"
      ]
    },
    {
      "cell_type": "markdown",
      "metadata": {
        "language": "markdown",
        "originalKey": "3dbf06b6-28ec-4b73-99f3-a9327b074159",
        "outputsInitialized": false,
        "showInput": false
      },
      "source": [
        "#### Plot best observed value vs iteration"
      ]
    },
    {
      "cell_type": "code",
      "execution_count": 14,
      "metadata": {
        "collapsed": false,
        "customOutput": null,
        "executionStartTime": 1724948509190,
        "executionStopTime": 1724948514271,
        "jupyter": {
          "outputs_hidden": false
        },
        "language": "python",
        "originalKey": "77d08a71-caf0-444c-994c-94a0f63efc42",
        "outputsInitialized": true,
        "requestMsgId": "77d08a71-caf0-444c-994c-94a0f63efc42",
        "serverExecutionDuration": 412.50938293524
      },
      "outputs": [
        {
          "data": {
            "image/png": 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",
            "text/plain": [
              "<Figure size 1000x600 with 1 Axes>"
            ]
          },
          "metadata": {},
          "output_type": "display_data"
        }
      ],
      "source": [
        "import numpy as np\n",
        "\n",
        "\n",
        "best_rgpe_all = np.array(best_rgpe_all)\n",
        "best_random_all = np.array(best_random_all)\n",
        "best_vanilla_nei_all = np.array(best_vanilla_nei_all)\n",
        "\n",
        "x = range(RANDOM_INITIALIZATION_SIZE, RANDOM_INITIALIZATION_SIZE + N_BATCH + 1)\n",
        "\n",
        "fig, ax = plt.subplots(1, 1, figsize=(10, 6))\n",
        "# Plot RGPE - LogNEI\n",
        "ax.errorbar(\n",
        "    x,\n",
        "    best_rgpe_all.mean(axis=0),\n",
        "    yerr=1.96 * best_rgpe_all.std(axis=0) / math.sqrt(N_TRIALS),\n",
        "    label=\"RGPE - LogNEI\",\n",
        "    linewidth=3,\n",
        "    capsize=5,\n",
        "    capthick=3,\n",
        ")\n",
        "# Plot SingleTaskGP - LogNEI\n",
        "ax.errorbar(\n",
        "    x,\n",
        "    best_vanilla_nei_all.mean(axis=0),\n",
        "    yerr=1.96 * best_vanilla_nei_all.std(axis=0) / math.sqrt(N_TRIALS),\n",
        "    label=\"SingleTaskGP - LogNEI\",\n",
        "    linewidth=3,\n",
        "    capsize=5,\n",
        "    capthick=3,\n",
        ")\n",
        "# Plot Random\n",
        "ax.errorbar(\n",
        "    x,\n",
        "    best_random_all.mean(axis=0),\n",
        "    yerr=1.96 * best_random_all.std(axis=0) / math.sqrt(N_TRIALS),\n",
        "    label=\"Random\",\n",
        "    linewidth=3,\n",
        "    capsize=5,\n",
        "    capthick=3,\n",
        ")\n",
        "ax.set_ylim(bottom=0)\n",
        "ax.set_xlabel(\"Iteration\", fontsize=12)\n",
        "ax.set_ylabel(\"Best Observed Value\", fontsize=12)\n",
        "ax.set_title(\"Best Observed Value by Iteration\", fontsize=12)\n",
        "ax.legend(loc=\"lower right\", fontsize=10)\n",
        "plt.tight_layout()"
      ]
    },
    {
      "cell_type": "code",
      "execution_count": null,
      "metadata": {
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